On the motion of a large number of small rigid bodies in a viscous incompressible fluid

Abstract

We consider the motion of N rigid bodies -- compact sets (S1, ·s, SN ) > 0 -- immersed in a viscous incompressible fluid contained in a domain in the Euclidean space Rd, d=2,3. We show the fluid flow is not influenced by the presence of the infinitely many bodies in the asymptotic limit 0 and N=N()→∞ as soon as \[ diam[Si ] 0 \ as\ 0 ,\ i=1,·s, N(). \] The result depends solely on the geometry of the bodies and is independent of their mass densities. Collisions are allowed and the initial data are arbitrary with finite energy.